“Phase Equilibriain Materials” · 2018. 1. 30. · Source: Reed-Hill, Abbaschian,Physical...

11

Advanced Physical MetallurgyAdvanced Physical Metallurgy

““Phase Phase EquilibriaEquilibria in Materialsin Materials””

EunEun SooSoo ParkPark

Office: 33-316 Telephone: 880-7221Email: espark@snu.ac.krOffice hours: by an appointment

2009 fall

10. 06. 2009

2

Contents for previous class

- Gibbs Phase Rule

- Invariant reaction

- Peritectic reaction

F = C − P + 2 (from T, P)

- Congruent transformationa melting point minimum, a melting point maximum, and a critical temperature associated with a order-disorder transformation

3

ΔΔHHmixmix = = --25 kJ/mol25 kJ/mol

4

Peritectic solidification

Fe C

5

Peritectic solidification

6

Peritectic solidification

7

Congruent vs IncongruentCongruent phase transformation: no compositional change associated with

transformation

Incongruent phase transformation:at least one phase will experience change in composition

Examples:

• Allotropic phase transformations• Melting points of pure metals• Congruent Melting Point

Examples:

• Melting in isomorphous alloys• Eutectic reactions• Pertectic Reactions• Eutectoid reactions

Ni Ti

8

Cu-Ni: Binary Isomorphous Alloy Example

Isomorphous systems contain metals which are completely soluble in each other and have a single type of crystal structure.

9

4.3.5. Non-stoichiometeric compounds

10

4.3.5. Non-stoichiometeric compounds

11

Contents for today’s class

- Monotectic reaction: Liquid1 ↔Liquid2+ solid

- Binary Phase Diagrams: Reactions in the Solid State

* Eutectoid reaction: α ↔ β + γ

* Monotectoid reaction: α1 ↔ β + α2

* Peritectoid reaction: α + β ↔ γ

- Synthetic reaction:

Liquid1+Liquid2 ↔ α

L1+L2

α

K-Zn, Na-Zn,K-Pb, Pb-U, Ca-Cd

- Allotropy of the Components

* SYSTEMS IN WHICH TWO PHASES ARE IN EQUILIBRIUM WITH THE LIQUID PHASE

* SYSTEMS IN WHICH ONE PHASE IS IN EQUILIBRIUM WITH THE LIQUID PHASE

Metatectic reaction: β ↔ L + α Ex. Co-Os, Co-Re and Co-Ru

12

ΔGm=NCXA(1-XA)+NkT[XAlnXA + (1-XA)ln(1-XA)] where, C=Z[HAB-(HAA+HBB)/2.

Here, C is an energy term, and k is bolzmann’s constant (energy/temperature).

13

Free energy and activity curves for (a) kT/C<0.5, (b) kT/C=0.5 (c) kT/C>0.5

14

Effect of very large positive deviations from ideality in changing the phase diagram from a eutectic to a monotectic reaction

Eutectic reaction: Liquid ↔α+β

Monotectic reaction: Liquid1 ↔Liquid2+ solid

The reversible transition, on cooling, of a liquid to a mixture of a second liquid and a solid

15G.A. Chadwick, Brit. J. App. Phys., 16 (1965) 1096

16

Monotectic

Source: Reed-Hill, Abbaschian, Physical Metallurgy Principles, 3rd Edition, PWS Publishing Company, 1994.

Monotectic Reaction: L L1 + Solid

Cu + L1

cool

heat

Pb and Zn do not mix in solid state:

• RT: Cu in Pb < 0.007%• RT: Pb in Cu ~ 0.002 – 0.005%

0.1281.9FCCCu

0.1751.8FCCPb

r (nm)electronegCrystalStructure

0.1281.9FCCCu

0.1751.8FCCPb

r (nm)electronegCrystalStructure

26.8%

17

18

19

20

Morphology in monotectic solidification

21

Case 1:22 11 llll γγγ αα −<

Hg-Te single crystal

22

Case 2: θγγγ αα cos22 11 llll +=

5.0−∝ Vλ

23

Case 3: 22 11 llll γγγ αα +>

24

Synthetic reaction

Ex.

25

Eutectoid reaction: α ↔ β + γ

Monotectoid reaction: α1 ↔ β + α2

Peritectoid reaction: α + β ↔ γ

Transformation can only proceed if –ΔGbulk > +ΔGinterface+ΔGstrain

Binary Phase Diagrams: Reactions in the Solid State

Disordered atomic arrangement at grain boundaries will reduce the strain energy factor and the interfacial energy needed to nucleate a new phase.

The finer the grain size, and hence the larger the grain boundary area, the more readily will the transformation proceed.

26

Iron-Carbon System

Source: Reed-Hill, Abbaschian, Physical Metallurgy Principles, 3rd Edition, PWS Publishing Company, 1994.

Diagram is not ever plotted past 12 wt%

Cementite

Hägg carbide

27

Iron Carbon Phase Diagram

ACM

A3

A1 (Eutectoid Temperature)

Formation of Ledeburite

Formation of Pearlite

Source: Reed-Hill, Abbaschian, Physical Metallurgy Principles, 3rd Edition, PWS Publishing Company, 1994.

Steel Cast Irons

FCC

α ferriteBCC

δ ferrite, BCC

28

Cementite – What is it?

• Cementite has an orthorhombic lattice with approximate parameters 0.45165, 0.50837 and 0.67297 nm.

• There are twelve iron atoms and four carbon atoms per

unit cell, corresponding to the formula Fe3C.

Source: http://www.msm.cam.ac.uk/phase-trans/2003/Lattices/cementite.htmlH. K. D. H. Bhadeshia

Purple: Carbon atomsOrange: Iron atoms

Iron Carbide – Ceramic Compound

29

Pearlite: What is it?

• The eutectoid transformation:γ (0.77% C) α (0.02%C) + Fe3C (6.67%C)

• Alternate lamellae of ferrite and cementite as the continuous phase

• Diffusional Transformation

• “Pearlite” name is related to the regular array of the lamellae in colonies. Etching attacks the ferrite phase more than the cementite. The raised and regularly spaced cementite lamellae act as diffraction gratings and a pearl-like luster is produced by the diffraction of light of various wavelengths from different colonies

30

Pearlite• Two phases appear in definite

ratio by the lever rule:

• Since the densities are same (7.86 and 7.4) lamellae widths are 7:1

• Heterogeneous nucleation and growth of pearlite colonies – but typically grows into only 1 grain

Reed-Hill, Abbaschian, 1994, [5]

%8867.6

77.067.6≈

−=α

%1267.6

077.0≈

−=cementite